{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Linear regression with various methods\n",
    "This is a very simple example of using two scipy tools for linear regression.\n",
    "* Scipy.Polyfit\n",
    "* Stats.linregress\n",
    "* Optimize.curve_fit\n",
    "* numpy.linalg.lstsq\n",
    "* statsmodels.OLS\n",
    "* Analytic solution using Moore-Penrose generalized inverse or simple multiplicative matrix inverse\n",
    "* sklearn.linear_model.LinearRegression"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Import libraries"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [
    {
     "name": "stderr",
     "output_type": "stream",
     "text": [
      "C:\\Users\\Tirtha\\Python\\Anaconda3\\lib\\site-packages\\statsmodels\\compat\\pandas.py:56: FutureWarning: The pandas.core.datetools module is deprecated and will be removed in a future version. Please use the pandas.tseries module instead.\n",
      "  from pandas.core import datetools\n"
     ]
    }
   ],
   "source": [
    "from scipy import linspace, polyval, polyfit, sqrt, stats, randn, optimize\n",
    "import statsmodels.api as sm\n",
    "import matplotlib.pyplot as plt\n",
    "import time\n",
    "import numpy as np\n",
    "from sklearn.linear_model import LinearRegression\n",
    "import pandas as pd\n",
    "%matplotlib inline"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Generate random data of a sufficiently large size"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "#Sample data creation\n",
    "#number of points \n",
    "n=int(5e6)\n",
    "t=np.linspace(-10,10,n)\n",
    "#parameters\n",
    "a=3.25; b=-6.5\n",
    "x=polyval([a,b],t)\n",
    "#add some noise\n",
    "xn=x+3*randn(n)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Draw few random sample points and plot"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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      "text/plain": [
       "<matplotlib.figure.Figure at 0x289503a98d0>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "xvar=np.random.choice(t,size=20)\n",
    "yvar=polyval([a,b],xvar)+3*randn(20)\n",
    "plt.scatter(xvar,yvar,c='green',edgecolors='k')\n",
    "plt.grid(True)\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Method: Scipy.Polyfit"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using polyfit\n",
      "parameters: a=3.25 b=-6.50, ms error= 3.000\n",
      "Time taken: 1.7698638439178467 seconds\n"
     ]
    }
   ],
   "source": [
    "#Linear regressison -polyfit - polyfit can be used other orders polynomials\n",
    "t1=time.time()\n",
    "(ar,br)=polyfit(t,xn,1)\n",
    "xr=polyval([ar,br],t)\n",
    "#compute the mean square error\n",
    "err=sqrt(sum((xr-xn)**2)/n)\n",
    "t2=time.time()\n",
    "t_polyfit = float(t2-t1)\n",
    "\n",
    "print('Linear regression using polyfit')\n",
    "print('parameters: a=%.2f b=%.2f, ms error= %.3f' % (ar,br,err))\n",
    "print(\"Time taken: {} seconds\".format(t_polyfit))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Method: Stats.linregress"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using stats.linregress\n",
      "a=3.25 b=-6.50, std error= 0.000, r^2 coefficient= 0.987\n",
      "Time taken: 0.15017366409301758 seconds\n"
     ]
    }
   ],
   "source": [
    "#Linear regression using stats.linregress\n",
    "t1=time.time()\n",
    "(a_s,b_s,r,tt,stderr)=stats.linregress(t,xn)\n",
    "t2=time.time()\n",
    "t_linregress = float(t2-t1)\n",
    "\n",
    "print('Linear regression using stats.linregress')\n",
    "print('a=%.2f b=%.2f, std error= %.3f, r^2 coefficient= %.3f' % (a_s,b_s,stderr,r))\n",
    "print(\"Time taken: {} seconds\".format(t_linregress))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Method: Optimize.curve_fit"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "def flin(t,a,b):\n",
    "    result = a*t+b\n",
    "    return(result)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using optimize.curve_fit\n",
      "parameters: a=3.25 b=-6.50\n",
      "Time taken: 1.2034447193145752 seconds\n"
     ]
    }
   ],
   "source": [
    "t1=time.time()\n",
    "p1,_=optimize.curve_fit(flin,xdata=t,ydata=xn,method='lm')\n",
    "t2=time.time()\n",
    "t_optimize_curve_fit = float(t2-t1)\n",
    "\n",
    "print('Linear regression using optimize.curve_fit')\n",
    "print('parameters: a=%.2f b=%.2f' % (p1[0],p1[1]))\n",
    "print(\"Time taken: {} seconds\".format(t_optimize_curve_fit))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Method: numpy.linalg.lstsq"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using numpy.linalg.lstsq\n",
      "parameters: a=3.25 b=-6.50, ms error= 3.000\n",
      "Time taken: 0.3698573112487793 seconds\n"
     ]
    }
   ],
   "source": [
    "t1=time.time()\n",
    "A = np.vstack([t, np.ones(len(t))]).T\n",
    "result = np.linalg.lstsq(A, xn)\n",
    "ar,br = result[0]\n",
    "err = np.sqrt(result[1]/len(xn))\n",
    "t2=time.time()\n",
    "t_linalg_lstsq = float(t2-t1)\n",
    "\n",
    "print('Linear regression using numpy.linalg.lstsq')\n",
    "print('parameters: a=%.2f b=%.2f, ms error= %.3f' % (ar,br,err))\n",
    "print(\"Time taken: {} seconds\".format(t_linalg_lstsq))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Method: Statsmodels.OLS"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 9,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using statsmodels.OLS\n",
      "parameters: a=3.25 b=-6.50\n",
      "Time taken: 0.9167804718017578 seconds\n"
     ]
    }
   ],
   "source": [
    "t1=time.time()\n",
    "t=sm.add_constant(t)\n",
    "model = sm.OLS(x, t)\n",
    "results = model.fit()\n",
    "ar=results.params[1]\n",
    "br=results.params[0]\n",
    "t2=time.time()\n",
    "t_OLS = float(t2-t1)\n",
    "\n",
    "print('Linear regression using statsmodels.OLS')\n",
    "print('parameters: a=%.2f b=%.2f'% (ar,br))\n",
    "print(\"Time taken: {} seconds\".format(t_OLS))      "
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 10,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "                            OLS Regression Results                            \n",
      "==============================================================================\n",
      "Dep. Variable:                      y   R-squared:                       1.000\n",
      "Model:                            OLS   Adj. R-squared:                  1.000\n",
      "Method:                 Least Squares   F-statistic:                 4.287e+34\n",
      "Date:                Fri, 08 Dec 2017   Prob (F-statistic):               0.00\n",
      "Time:                        23:09:33   Log-Likelihood:             1.3904e+08\n",
      "No. Observations:             5000000   AIC:                        -2.781e+08\n",
      "Df Residuals:                 4999998   BIC:                        -2.781e+08\n",
      "Df Model:                           1                                         \n",
      "Covariance Type:            nonrobust                                         \n",
      "==============================================================================\n",
      "                 coef    std err          t      P>|t|      [0.025      0.975]\n",
      "------------------------------------------------------------------------------\n",
      "const         -6.5000   9.06e-17  -7.17e+16      0.000      -6.500      -6.500\n",
      "x1             3.2500   1.57e-17   2.07e+17      0.000       3.250       3.250\n",
      "==============================================================================\n",
      "Omnibus:                  4418788.703   Durbin-Watson:                   0.000\n",
      "Prob(Omnibus):                  0.000   Jarque-Bera (JB):           299716.811\n",
      "Skew:                          -0.001   Prob(JB):                         0.00\n",
      "Kurtosis:                       1.801   Cond. No.                         5.77\n",
      "==============================================================================\n",
      "\n",
      "Warnings:\n",
      "[1] Standard Errors assume that the covariance matrix of the errors is correctly specified.\n"
     ]
    }
   ],
   "source": [
    "print(results.summary())"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Analytic solution using Moore-Penrose pseudoinverse"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 11,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using Moore-Penrose inverse\n",
      "parameters: a=3.25 b=-6.50\n",
      "Time taken: 0.6019864082336426 seconds\n"
     ]
    }
   ],
   "source": [
    "t1=time.time()\n",
    "mpinv = np.linalg.pinv(t)\n",
    "result = mpinv.dot(x)\n",
    "ar = result[1]\n",
    "br = result[0]\n",
    "t2=time.time()\n",
    "t_inv_matrix = float(t2-t1)\n",
    "\n",
    "print('Linear regression using Moore-Penrose inverse')\n",
    "print('parameters: a=%.2f b=%.2f'% (ar,br))\n",
    "print(\"Time taken: {} seconds\".format(t_inv_matrix)) "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Analytic solution using simple multiplicative matrix inverse"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 12,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using simple inverse\n",
      "parameters: a=3.25 b=-6.50\n",
      "Time taken: 0.13125276565551758 seconds\n"
     ]
    }
   ],
   "source": [
    "t1=time.time()\n",
    "m = np.dot((np.dot(np.linalg.inv(np.dot(t.T,t)),t.T)),x)\n",
    "ar = m[1]\n",
    "br = m[0]\n",
    "t2=time.time()\n",
    "t_simple_inv = float(t2-t1)\n",
    "\n",
    "print('Linear regression using simple inverse')\n",
    "print('parameters: a=%.2f b=%.2f'% (ar,br))\n",
    "print(\"Time taken: {} seconds\".format(t_simple_inv)) "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Method: sklearn.linear_model.LinearRegression"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 13,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Linear regression using sklearn.linear_model.LinearRegression\n",
      "parameters: a=3.25 b=-6.50\n",
      "Time taken: 0.5318112373352051 seconds\n"
     ]
    }
   ],
   "source": [
    "t1=time.time()\n",
    "lm = LinearRegression()\n",
    "lm.fit(t,x)\n",
    "ar=lm.coef_[1]\n",
    "br=lm.intercept_\n",
    "t2=time.time()\n",
    "t_sklearn_linear = float(t2-t1)\n",
    "\n",
    "print('Linear regression using sklearn.linear_model.LinearRegression')\n",
    "print('parameters: a=%.2f b=%.2f'% (ar,br))\n",
    "print(\"Time taken: {} seconds\".format(t_sklearn_linear)) "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Bucket all the execution times in a list and plot"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 14,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "times = [t_polyfit,t_linregress,t_optimize_curve_fit,t_linalg_lstsq,t_OLS,t_inv_matrix,t_simple_inv,t_sklearn_linear]"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 15,
   "metadata": {},
   "outputs": [
    {
     "data": {
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7V9cD9yPVtUPXVNXD9mLzrCr9PnNZv6439G3F3I4jfcy8uJ//I1X1PVX1hj5m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\nPdIl/f68P7lOkl9Pkqp6arL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      "text/plain": [
       "<matplotlib.figure.Figure at 0x2895976c6a0>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "plt.figure(figsize=(20,5))\n",
    "plt.grid(True)\n",
    "plt.bar(left=[l*0.8 for l in range(8)],height=times, width=0.4,\n",
    "        tick_label=['Polyfit','Stats.linregress','Optimize.curve_fit',\n",
    "                    'numpy.linalg.lstsq','statsmodels.OLS','Moore-Penrose matrix inverse',\n",
    "                    'Simple matrix inverse','sklearn.linear_model'])\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "n_min = 50000\n",
    "n_max = int(1e7)\n",
    "n_levels = 25\n",
    "r = np.log10(n_max/n_min)\n",
    "l = np.linspace(0,r,n_levels)\n",
    "n_data = list((n_min*np.power(10,l)))\n",
    "n_data = [int(n) for n in n_data]"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "outputs": [],
   "source": [
    "#time_dict={'Polyfit':[],'Stats.lingress':[],'Optimize.curve_fit':[],'linalg.lstsq':[],'statsmodels.OLS':[],\n",
    "          #'Moore-Penrose matrix inverse':[],'Simple matrix inverse':[], 'sklearn.linear_model':[]}\n",
    "\n",
    "l1=['Polyfit', 'Stats.lingress','Optimize.curve_fit', 'linalg.lstsq', \n",
    " 'statsmodels.OLS', 'Moore-Penrose matrix inverse', 'Simple matrix inverse', 'sklearn.linear_model']\n",
    "time_dict = {key:[] for key in l1}\n",
    "\n",
    "from tqdm import tqdm\n",
    "\n",
    "for i in tqdm(range(len(n_data))):\n",
    "    t=np.linspace(-10,10,n_data[i])\n",
    "    #parameters\n",
    "    a=3.25; b=-6.5\n",
    "    x=polyval([a,b],t)\n",
    "    #add some noise\n",
    "    xn=x+3*randn(n_data[i])\n",
    "    \n",
    "    #Linear regressison -polyfit - polyfit can be used other orders polynomials\n",
    "    t1=time.time()\n",
    "    (ar,br)=polyfit(t,xn,1)\n",
    "    t2=time.time()\n",
    "    t_polyfit = 1e3*float(t2-t1)\n",
    "    time_dict['Polyfit'].append(t_polyfit)\n",
    "    \n",
    "    #Linear regression using stats.linregress\n",
    "    t1=time.time()\n",
    "    (a_s,b_s,r,tt,stderr)=stats.linregress(t,xn)\n",
    "    t2=time.time()\n",
    "    t_linregress = 1e3*float(t2-t1)\n",
    "    time_dict['Stats.lingress'].append(t_linregress)\n",
    "    \n",
    "    #Linear regression using optimize.curve_fit\n",
    "    t1=time.time()\n",
    "    p1,_=optimize.curve_fit(flin,xdata=t,ydata=xn,method='lm')\n",
    "    t2=time.time()\n",
    "    t_optimize_curve_fit = 1e3*float(t2-t1)\n",
    "    time_dict['Optimize.curve_fit'].append(t_optimize_curve_fit)\n",
    "    \n",
    "    # Linear regression using np.linalg.lstsq (solving Ax=B equation system)\n",
    "    t1=time.time()\n",
    "    A = np.vstack([t, np.ones(len(t))]).T\n",
    "    result = np.linalg.lstsq(A, xn)\n",
    "    ar,br = result[0]\n",
    "    t2=time.time()\n",
    "    t_linalg_lstsq = 1e3*float(t2-t1)\n",
    "    time_dict['linalg.lstsq'].append(t_linalg_lstsq)\n",
    "    \n",
    "    # Linear regression using statsmodels.OLS\n",
    "    t1=time.time()\n",
    "    t=sm.add_constant(t)\n",
    "    model = sm.OLS(x, t)\n",
    "    results = model.fit()\n",
    "    ar=results.params[1]\n",
    "    br=results.params[0]\n",
    "    t2=time.time()\n",
    "    t_OLS = 1e3*float(t2-t1)\n",
    "    time_dict['statsmodels.OLS'].append(t_OLS)\n",
    "    \n",
    "    # Linear regression using Moore-Penrose pseudoinverse matrix\n",
    "    t1=time.time()\n",
    "    mpinv = np.linalg.pinv(t)\n",
    "    result = mpinv.dot(x)\n",
    "    ar = result[1]\n",
    "    br = result[0]\n",
    "    t2=time.time()\n",
    "    t_mpinverse = 1e3*float(t2-t1)\n",
    "    time_dict['Moore-Penrose matrix inverse'].append(t_mpinverse)\n",
    "    \n",
    "    # Linear regression using simple multiplicative inverse matrix\n",
    "    t1=time.time()\n",
    "    m = np.dot((np.dot(np.linalg.inv(np.dot(t.T,t)),t.T)),x)\n",
    "    ar = m[1]\n",
    "    br = m[0]\n",
    "    t2=time.time()\n",
    "    t_simple_inv = 1e3*float(t2-t1)\n",
    "    time_dict['Simple matrix inverse'].append(t_simple_inv)\n",
    "    \n",
    "    # Linear regression using scikit-learn's linear_model\n",
    "    t1=time.time()\n",
    "    lm = LinearRegression()\n",
    "    lm.fit(t,x)\n",
    "    ar=lm.coef_[1]\n",
    "    br=lm.intercept_\n",
    "    t2=time.time()\n",
    "    t_sklearn_linear = 1e3*float(t2-t1)\n",
    "    time_dict['sklearn.linear_model'].append(t_sklearn_linear)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [
    {
     "data": {
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       "  <thead>\n",
       "    <tr style=\"text-align: right;\">\n",
       "      <th></th>\n",
       "      <th>Moore-Penrose matrix inverse</th>\n",
       "      <th>Optimize.curve_fit</th>\n",
       "      <th>Polyfit</th>\n",
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       "    <tr>\n",
       "      <th>4</th>\n",
       "      <td>15.625477</td>\n",
       "      <td>19.137859</td>\n",
       "      <td>15.630722</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>18.176317</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>15.627146</td>\n",
       "      <td>15.618801</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>5</th>\n",
       "      <td>4.007816</td>\n",
       "      <td>31.253576</td>\n",
       "      <td>22.130489</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>15.628815</td>\n",
       "      <td>15.621901</td>\n",
       "      <td>31.254768</td>\n",
       "      <td>33.256292</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>6</th>\n",
       "      <td>18.633366</td>\n",
       "      <td>53.041935</td>\n",
       "      <td>31.249762</td>\n",
       "      <td>3.501654</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>15.632153</td>\n",
       "      <td>46.875238</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>7</th>\n",
       "      <td>31.255722</td>\n",
       "      <td>53.006411</td>\n",
       "      <td>46.876192</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>31.256199</td>\n",
       "      <td>31.252623</td>\n",
       "      <td>37.758827</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>8</th>\n",
       "      <td>15.657902</td>\n",
       "      <td>69.021463</td>\n",
       "      <td>32.253742</td>\n",
       "      <td>15.627623</td>\n",
       "      <td>15.626431</td>\n",
       "      <td>15.619516</td>\n",
       "      <td>31.259298</td>\n",
       "      <td>68.526506</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>9</th>\n",
       "      <td>31.253576</td>\n",
       "      <td>84.650755</td>\n",
       "      <td>47.293186</td>\n",
       "      <td>0.000000</td>\n",
       "      <td>15.624762</td>\n",
       "      <td>31.246662</td>\n",
       "      <td>37.778139</td>\n",
       "      <td>69.011211</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>10</th>\n",
       "      <td>37.775517</td>\n",
       "      <td>115.889788</td>\n",
       "      <td>69.014549</td>\n",
       "      <td>15.623808</td>\n",
       "      <td>15.629768</td>\n",
       "      <td>33.759832</td>\n",
       "      <td>46.875000</td>\n",
       "      <td>82.136869</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>11</th>\n",
       "      <td>50.890923</td>\n",
       "      <td>148.653030</td>\n",
       "      <td>100.265026</td>\n",
       "      <td>2.500057</td>\n",
       "      <td>15.624285</td>\n",
       "      <td>36.260605</td>\n",
       "      <td>67.022562</td>\n",
       "      <td>115.892887</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>12</th>\n",
       "      <td>51.916361</td>\n",
       "      <td>169.280767</td>\n",
       "      <td>100.261211</td>\n",
       "      <td>15.595436</td>\n",
       "      <td>15.626669</td>\n",
       "      <td>46.873331</td>\n",
       "      <td>84.640265</td>\n",
       "      <td>133.024454</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>13</th>\n",
       "      <td>69.013357</td>\n",
       "      <td>204.277992</td>\n",
       "      <td>131.512642</td>\n",
       "      <td>31.260490</td>\n",
       "      <td>33.258915</td>\n",
       "      <td>62.905312</td>\n",
       "      <td>84.661484</td>\n",
       "      <td>169.303179</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>14</th>\n",
       "      <td>105.759859</td>\n",
       "      <td>263.057709</td>\n",
       "      <td>178.895473</td>\n",
       "      <td>31.325102</td>\n",
       "      <td>21.633863</td>\n",
       "      <td>69.040298</td>\n",
       "      <td>131.505728</td>\n",
       "      <td>247.957468</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>15</th>\n",
       "      <td>131.574392</td>\n",
       "      <td>319.949627</td>\n",
       "      <td>216.182470</td>\n",
       "      <td>32.747269</td>\n",
       "      <td>62.495470</td>\n",
       "      <td>81.153154</td>\n",
       "      <td>120.925665</td>\n",
       "      <td>253.957272</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>16</th>\n",
       "      <td>153.636217</td>\n",
       "      <td>448.011875</td>\n",
       "      <td>269.543409</td>\n",
       "      <td>46.900511</td>\n",
       "      <td>53.393364</td>\n",
       "      <td>115.928888</td>\n",
       "      <td>169.338226</td>\n",
       "      <td>316.501141</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>17</th>\n",
       "      <td>231.811762</td>\n",
       "      <td>701.419353</td>\n",
       "      <td>300.346613</td>\n",
       "      <td>65.008879</td>\n",
       "      <td>53.394318</td>\n",
       "      <td>178.601742</td>\n",
       "      <td>220.121384</td>\n",
       "      <td>422.495842</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>18</th>\n",
       "      <td>285.177946</td>\n",
       "      <td>616.899490</td>\n",
       "      <td>432.182074</td>\n",
       "      <td>69.028854</td>\n",
       "      <td>84.664822</td>\n",
       "      <td>215.755463</td>\n",
       "      <td>285.164833</td>\n",
       "      <td>517.048597</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>19</th>\n",
       "      <td>332.066059</td>\n",
       "      <td>819.245577</td>\n",
       "      <td>501.351357</td>\n",
       "      <td>84.640741</td>\n",
       "      <td>120.899916</td>\n",
       "      <td>231.451511</td>\n",
       "      <td>347.280264</td>\n",
       "      <td>670.651913</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>20</th>\n",
       "      <td>369.444609</td>\n",
       "      <td>1024.812222</td>\n",
       "      <td>585.524321</td>\n",
       "      <td>115.913153</td>\n",
       "      <td>131.541967</td>\n",
       "      <td>278.692007</td>\n",
       "      <td>447.981596</td>\n",
       "      <td>770.556927</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>21</th>\n",
       "      <td>685.094118</td>\n",
       "      <td>1249.316692</td>\n",
       "      <td>748.612404</td>\n",
       "      <td>216.203928</td>\n",
       "      <td>153.661489</td>\n",
       "      <td>416.716337</td>\n",
       "      <td>701.471090</td>\n",
       "      <td>955.613136</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>22</th>\n",
       "      <td>748.389482</td>\n",
       "      <td>1572.880745</td>\n",
       "      <td>886.412144</td>\n",
       "      <td>200.346470</td>\n",
       "      <td>200.551510</td>\n",
       "      <td>463.643789</td>\n",
       "      <td>686.309099</td>\n",
       "      <td>1224.907160</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>23</th>\n",
       "      <td>887.850046</td>\n",
       "      <td>1884.766817</td>\n",
       "      <td>1202.514887</td>\n",
       "      <td>216.167450</td>\n",
       "      <td>251.927853</td>\n",
       "      <td>539.185524</td>\n",
       "      <td>886.838436</td>\n",
       "      <td>1535.134792</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>24</th>\n",
       "      <td>954.769611</td>\n",
       "      <td>2425.298929</td>\n",
       "      <td>1450.640917</td>\n",
       "      <td>269.577265</td>\n",
       "      <td>332.119942</td>\n",
       "      <td>696.031809</td>\n",
       "      <td>1049.167395</td>\n",
       "      <td>1888.795376</td>\n",
       "    </tr>\n",
       "  </tbody>\n",
       "</table>\n",
       "</div>"
      ],
      "text/plain": [
       "    Moore-Penrose matrix inverse  Optimize.curve_fit      Polyfit  \\\n",
       "0                       0.000000            0.000000    15.630484   \n",
       "1                       0.000000            0.000000    15.630245   \n",
       "2                      15.622139           15.624523    15.627623   \n",
       "3                      15.625238           15.636921    22.137165   \n",
       "4                      15.625477           19.137859    15.630722   \n",
       "5                       4.007816           31.253576    22.130489   \n",
       "6                      18.633366           53.041935    31.249762   \n",
       "7                      31.255722           53.006411    46.876192   \n",
       "8                      15.657902           69.021463    32.253742   \n",
       "9                      31.253576           84.650755    47.293186   \n",
       "10                     37.775517          115.889788    69.014549   \n",
       "11                     50.890923          148.653030   100.265026   \n",
       "12                     51.916361          169.280767   100.261211   \n",
       "13                     69.013357          204.277992   131.512642   \n",
       "14                    105.759859          263.057709   178.895473   \n",
       "15                    131.574392          319.949627   216.182470   \n",
       "16                    153.636217          448.011875   269.543409   \n",
       "17                    231.811762          701.419353   300.346613   \n",
       "18                    285.177946          616.899490   432.182074   \n",
       "19                    332.066059          819.245577   501.351357   \n",
       "20                    369.444609         1024.812222   585.524321   \n",
       "21                    685.094118         1249.316692   748.612404   \n",
       "22                    748.389482         1572.880745   886.412144   \n",
       "23                    887.850046         1884.766817  1202.514887   \n",
       "24                    954.769611         2425.298929  1450.640917   \n",
       "\n",
       "    Simple matrix inverse  Stats.lingress  linalg.lstsq  sklearn.linear_model  \\\n",
       "0                0.000000        0.000000     15.625477             15.621424   \n",
       "1                0.000000        0.000000      0.000000              0.000000   \n",
       "2                0.000000        0.000000      0.000000              0.000000   \n",
       "3                0.000000        0.000000      0.000000              0.000000   \n",
       "4                0.000000       18.176317      0.000000             15.627146   \n",
       "5                0.000000       15.628815     15.621901             31.254768   \n",
       "6                3.501654        0.000000      0.000000             15.632153   \n",
       "7                0.000000        0.000000     31.256199             31.252623   \n",
       "8               15.627623       15.626431     15.619516             31.259298   \n",
       "9                0.000000       15.624762     31.246662             37.778139   \n",
       "10              15.623808       15.629768     33.759832             46.875000   \n",
       "11               2.500057       15.624285     36.260605             67.022562   \n",
       "12              15.595436       15.626669     46.873331             84.640265   \n",
       "13              31.260490       33.258915     62.905312             84.661484   \n",
       "14              31.325102       21.633863     69.040298            131.505728   \n",
       "15              32.747269       62.495470     81.153154            120.925665   \n",
       "16              46.900511       53.393364    115.928888            169.338226   \n",
       "17              65.008879       53.394318    178.601742            220.121384   \n",
       "18              69.028854       84.664822    215.755463            285.164833   \n",
       "19              84.640741      120.899916    231.451511            347.280264   \n",
       "20             115.913153      131.541967    278.692007            447.981596   \n",
       "21             216.203928      153.661489    416.716337            701.471090   \n",
       "22             200.346470      200.551510    463.643789            686.309099   \n",
       "23             216.167450      251.927853    539.185524            886.838436   \n",
       "24             269.577265      332.119942    696.031809           1049.167395   \n",
       "\n",
       "    statsmodels.OLS  \n",
       "0         15.629292  \n",
       "1         22.155523  \n",
       "2         15.625715  \n",
       "3         15.619516  \n",
       "4         15.618801  \n",
       "5         33.256292  \n",
       "6         46.875238  \n",
       "7         37.758827  \n",
       "8         68.526506  \n",
       "9         69.011211  \n",
       "10        82.136869  \n",
       "11       115.892887  \n",
       "12       133.024454  \n",
       "13       169.303179  \n",
       "14       247.957468  \n",
       "15       253.957272  \n",
       "16       316.501141  \n",
       "17       422.495842  \n",
       "18       517.048597  \n",
       "19       670.651913  \n",
       "20       770.556927  \n",
       "21       955.613136  \n",
       "22      1224.907160  \n",
       "23      1535.134792  \n",
       "24      1888.795376  "
      ]
     },
     "execution_count": 7,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "df = pd.DataFrame(data=time_dict)\n",
    "df"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "<matplotlib.legend.Legend at 0x24edb8101d0>"
      ]
     },
     "execution_count": 8,
     "metadata": {},
     "output_type": "execute_result"
    },
    {
     "data": {
      "image/png": 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PUrt27QzrDR48mI8++oiDBw+ybt06i6eoixYtIioqiqCgIFq2bMmuXbv45Zdf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fjnP//J4MGDi2xQQ0JCWLlyJRMnTmTq1KnMmjWLrKwsKleuTP369fnPf/5DbGxsiTmHDx9OdnY2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\nh0sJIYQQQjQEZ9Pgf7dDjrPAoOM4mPJ38A2u93QOHDjAggULKKl0dIivr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R7Krn65WqAm\nAY9rmnYUmAksU0qdW0Eehz7dVwghhBCicVIKspP0TuneH6G8oPo9Bm/oeJPeLW0/Grzct44yLy+P\n5ORktm/fXmO3NDg4mISEBBISEggNrbupxHZlJ6swy9kZzU0lNSeVYkv1NZo1CfYJpktEF7pEdqFz\nZGeGtBxCoHdgneXnilM5JexankHw/nxamvWjJyo71y1dZrQR0SGckV2a8rtO0UQFN76puxeilGLL\n3O/Y+K3zmKPgyCimPP8yTVq5r8svLl9poZmU5VnsWX8Mm7XqlPOWncLpNyGOpnHuWS7QULlaoD4D\nLAR2A9k4z0IFmAZsrOO8hBBCCCHcLzdDX1O6czbkVV/PCUDLvvq60q5TICDCbanYbDYOHjzItm3b\nSE9Pr/Ge9u3bk5iYSPv27TEaazft1Ga3kVmY6ShG9+XsY3/ufkqt1TdbqkmobyidIzrTJbKL40/L\noJYe6TzmlZhZvzmbsqST9Cyw0ZnqORzGxlpfBd0iGNy9GV/HR+Ln3Xin7l6IxWxi3b+/YNeqZY5Y\nVOtYpjz/CkERkR7MTFRWXmJh+8oj7Fp7FOt55+w2iw+l34Q4WnRsvGeZ1oZLBapSah8Qr2laJJB7\n3tmnzwIn3ZGcEEIIIUSdK8uDvfP0ojR7c833hLWBHrfDddMgMt6t6eTn5zu6pcXF1TuVwcHB9OrV\ni4SEBMLCrmxVldVu5XDB4Sqd0f25+ymzXnqaLkC4b7ijCO0c2ZnCtEKmjJji0WmwheUWVu45Sdqm\no3Q8Xk4fx4+1zpxMKLYHaJR3iaBn/xa82CL0qpi6e76S/Dwytm8lfVsSWbu2YzU7z79t3a0HE575\nA74B9dvJFjUzl1nZuSabHSuPYC6vWphGtwmm34Q4WnWJuCq/T111WeegKqVyaojtruleIYQQQogG\nw2aBQ6v0KbwHloLNXP0e31DoOklfV9q6v9vWlYLeLU1LS2Pbtm0cOnSoxnvatWtHYmIiHTp0uOxu\naaG5kPXZ69l1Zhf7cvdxMPcg5bZyl14b6RfpKES7RHaha2RXYgJiqvzAvO7wOo/8AF1qtrJm/2lW\nJx8jJK2A8XZv+mHg/B9pz3hBfqcwOo9qyy0xV9+GMkopco4eIX3bFtKTt3Di0EF9mvp5Og8ayo2P\n/hqjl5xx6mkWk43d646SsiILU0nVde2RLQLpOz6Otj2a1OrflenQIQqXLCEwOxuGDq1lxp5zwQJV\n07S3gQ+VUkcrPr4YpZR6rm5TE0IIIYSoBaX0nXd3fgt7foDSar9nB80I7Ufp3dIOY8Dbz60pFRQU\nkJKSQkpKCkVF1c9PDQoKcnRLw8Mvb3pfqaWUddnrWJq5lI3HNmKxWy75mij/qCpTdDtHdCY6ILpB\ndW9MVhvrD5xh4c7jHNt7lrE2I0/ijQ9V14zagbMxfjQd2pqePaLRDA3nc6gLNquVY/v3OorSgtOn\nLnhvePOW9Bh5EwljJsgZpx5mtdjYu+E4ycuyKCus+ouxsJgA+o5vS7uEK/9+NWdlUbh0KYWLl2BK\nSwMgIDAQZTaj+Xj+vOErcbEO6q3AN8DRio8vRqGfhyqEEEII4VlFp/TzSnf8F87sr/meZj31Tmm3\nqRAU5dZ07HY7aWlpJCcnk5aWhqqh0xUXF0fv3r3p2LHjZXVLy63l/HzsZ5YeXspPR3+6aJc0JiDG\n0RntGtmVzhGdiQpw7+d+pSw2OxsPnWXRrhOs3XOS/iaNKfjQEf9q95q8DfgkRNN8aCtah7v3Fwz1\nrby4mMM7k0nftoXMHcmYSqtvmAWgaQZadOpCfGJf4hL7EdG8RT1nKs5ns9n/n703D470TA/7ft/V\ndzfQjfsGBnNfPIYccne1S8yKu0tyJctaJ7EsybIUp8qWq+xKIieKVbJOH2U5ViVKUiqXXHYqsrWK\nFcsuLUVyRe7ukFzuikPOcDick3PjRp/o+/iON398jQYwaACNAebk+2O99X39Hd1fYxrg9+vneZ+H\nyz+Y48PXblHIVFfti3T6ePbrY+w93oOqbf0LBHNujtzrb5B77TUq58+v2a8WixR+8APCj2gUdV1B\nFUKMNVuXSCQSiUQieeiwavDp6/DRf3BTeYW99pjIgNur9OhPQff+HXtpx3GwLAvTNNeMmzdvcubM\nGXK53JrzgsFgI1oai7VefMm0TX4490Nev/k635v6HkWzubQc7DjIiaETHO48zIHYATr8D3eBHNsR\nnLqZ5lvnZnn9kzn8JYufxMMf4ifSpOiR0xug40uDBI50oRiPT5RwcX6O66dPcf30+0xfOo9wnKbH\nefx+Rp84xvgzzzH25DH84Xvb+1bSGo4j+PTUPB+8epNccvUXRsF2L8+8MsqBz/eh6Vv7zFrJJLlv\nf5vca69TPn266TGKz0doYoKpkWH2Pf/8Xb+HB82W5qBKJBKJRCKRPFTMfexK6Sd/AuX0mt2WHqa2\n769g7v8JzJ6nMG0bs2JiXr/eVChXjvWks9lxW2FsbKwRLdX11m7FbMfmg4UPeOPmG7x5+01ytbXC\nC7C7fTcvj73MS6MvMRwZ3tJ1PQiEEJyZXORbH8/y2idzJPNVnkPnVzB4Dh/qHWIqNIXgk12EPteP\nZ/Dx6AnpODbz1z6tp+6eIjU9ue6x4c4uxo89x/gzzzF08LCcW/oQsbhQ4trpOFfen2dxYXUlbH/Y\n4NhLoxz6Uj/6FipH24uL5N58k9xrr1F6/xQ0+7LCMAh98YtEXnmF8IkJ1GCQaydPovoe3WyCjeag\nvrKVJxJCvLb9y5FIJBKJRCLZhGLSbQ1z9o9goXmtxpner3JSPMu1eBlxQcCFHwI/vL/XuYJAIMCT\nTz7JsWPH6OhoLZLpCIez8bO8fvN13rz9JqlKkzm0wHB4uCGlu6O7d/Ky7wlCCC7M5vjWuVle/XiO\nmcUyERS+jsFPEqKftZElLeYj9HwfgWM9aMFHX8rMSoVbn3zE9Q/f5+ZHH1LKLq57bO/4HsaPPceu\nY8fpGhl7qOYHf9ZJzxW5fibO9TNxUjNrMxm8QZ2nvzrCkYlBDG9rYmoXChS++11yf/4ahffeg2Zf\ngGkaweefd6X0xR9F28FeyA8DG31t9yru3NJWfgsE8Pg1kpJIJBKJRPJwYJt0JE/BH/8BfPptaFYA\nqG2I2V0/xcnFXj69OQ201s9zJ9B1HcMw1oxgMMihQ4c4cOBAS9FSIQQXUxd5/ebrvHHrDRZKzQvh\n9AX7eGn0JV4ae4kDsQOPhLRcXcjzrY9nefXcHDeS7s38PlT+ET5exMB75y2nAr69UYKf68e3N/rI\nFz3Kp5PcOP0B10+/z+T5j7HN5kWsdMPD8JEnXCl9+lnZu/QhIzVb4PrpONc/SpCebZ5e7/FpPPHi\nME/+6BAe/+a/9065TOHtt8m99jqFt99GVKtrD1IUAseOEfn6K4S/+lX0Fr/oehTZ6Ccm551KJBKJ\nRCJ5sMQvwUf/Hs79R44U42v36z448FeYH/kJTl7Nc/mjK7j1HZfx+XxN5XErYz0BXdqnbqNSqhCC\nq4tXeePmG7x+83WmC9NNj+v0d/K10a/x0uhLHO06iqo8/PMub6eKvHpujm99PMvlebdqsQd4CYNv\n4OFgk/iG4tcJPttD6Lk+9I61RZEeFYQQJG7fbKTuLty4uu6xgbZ2dj19nPFjxxk58iTGI5ye+bgh\nhCA1sxwpzcw3/+JL01WGD8XYfayb0SOdm4qpU6tR/P575F57jfx3v4soNX9e3xNHaXvlFcIvvYTR\n07Pt9/MosFGRpNv380IkEolEIpFIACil4fx/grP/AWY/an7M4HF46mdY6PoiJ3/4IZde/XDNIYcO\nHeKFF16gu7v7Hl/w3XEre4s3br3BGzff4Hr2etNj2r3tfGXkK7w0+hLHeo6hqQ9/wprtCP7s4xn+\n3Xu3ODedbWzvReGv4uHrGESbpPEaAyFCn+sj8EQXyhbm6T1ILNOktJihkElRyKQppNMUMyny6RTT\nF8+TTyXWPbdzaIRdx44zfuw5+nbvle1gHiKEECSnlyOld84pXUI3VEYOdzD+dDcjRzrw+DaWUmFZ\nFN9/35XSN9/CaVI8DcC7fz+RV14h8vJLeIaGtv1+HjU2moMa2MoTCSHuXx6NRCKRSCSSxwvHhuvf\ng7P/Hi7/Odi1NYdUPTG8x/8WPPHTxEU7J0+e5OK3/nDNcQcPHuSFF16g5yGMNswWZhtSeil9qekx\nISPEl4e/zMtjL/Nc33MY6qMx59J2BN/6eJbf+87VRgqvAjyLxjfw8Hn0NUWP0BQCR7sIfq4Pz1D4\noUlVti2L4mKGYibdkE93fXlZyKSp5JsLRjNUTWPwwKH6fNLnaO/pvYfvQLJVhBAkpwpcO+1GSrOJ\nctPjdI/KyOFOdh/rZvhQbHMpdRzKp0+Tfe018t/+C+z02mJuAJ6xMVdKX3kZ7/j4tt/Po8xGP9EC\n7tzSVnk0vuqSSCQSiUTy8JC85krpx38M+bm1+zUP7HsFnvpZ/nJK5eCRo7z99tucb9L7b//+/UxM\nTNDb+3Dd+CdKCf7i9l/w+s3X+TjxcdNj/LqficEJXhp7iS8MfAGv5r3PV3n32I7g1XOz/O/fucqN\nhCumURS+gsFP4mGoWdGjdi/B5/sIPtODFvLct2t1bJtiNkMxXZfNxfSqyOeSeJZz2c2frAW8wSBj\nTz7D+LHjjD55DF8wtCPPK9kZhBDEb+cb6bt3toVZQvdqjB1xI6XDhzswPBtrjxCCyiefkPvz18i9\n8QbWQvO55MbAgCulX38F7759D80XNA+ajQT1v2VrgiqRSCQSiUSyOZUcXPhTtwrv1PvNj+l7Ep76\nWTj81yAQI5lMcuHN/8j33nl3zaH79u1jYmKCvr6+e3zhrWE7NlcyVzizcIbvTn2XD+c/RDS5p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mhiZ4ousJdPXxTR1ttIO5mKJyIYWVXH+m1WJY52JQ5du1Kt9Jp1bt8+oqP/PcCH93ojUxtS2T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\nSUVORK5CYII=\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x24edb8105f8>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "plt.figure(figsize=(15,10))\n",
    "for i in df.columns:\n",
    "    plt.semilogx((n_data),df[i],lw=3)\n",
    "plt.xticks([1e5,2e5,5e5,1e6,2e6,5e6,1e7],fontsize=15)\n",
    "plt.xlabel(\"\\nSize of the data set (number of samples)\",fontsize=15)\n",
    "plt.yticks(fontsize=15)\n",
    "plt.ylabel(\"Milliseconds needed for simple linear regression model fit\\n\",fontsize=15)\n",
    "plt.grid(True)\n",
    "plt.legend([name for name in df.columns],fontsize=20)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 9,
   "metadata": {
    "collapsed": true
   },
   "outputs": [],
   "source": [
    "a1=df.iloc[n_levels-1]"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 10,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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fm+SYDCczm8d1fs1Mv3s+Z7i664YkXzPGwGeSPHX87sVJnrV4mc+M54VJXrgf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\nRU5ErkJggg==\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x24e8567acf8>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "plt.figure(figsize=(20,5))\n",
    "plt.grid(True)\n",
    "plt.bar(left=[l*0.8 for l in range(8)],height=a1, width=0.4,\n",
    "        tick_label=list(a1.index))\n",
    "plt.show()"
   ]
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python 3",
   "language": "python",
   "name": "python3"
  },
  "language_info": {
   "codemirror_mode": {
    "name": "ipython",
    "version": 3
   },
   "file_extension": ".py",
   "mimetype": "text/x-python",
   "name": "python",
   "nbconvert_exporter": "python",
   "pygments_lexer": "ipython3",
   "version": "3.6.2"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}
